The Absorption Theorem for the Beltrami-Vekua Normal Form

Abstract

The Beltrami-Vekua normal form assigns to every smooth first-order real planar elliptic system a complex equation w z-μwz+Aw+B w=F by an explicit pipeline. A companion paper showed that the density Θ=|B|2/(1-|μ|2)\,dx\,dy and its total mass are invariants under multiplicative gauges wϕw and orientation-preserving diffeomorphisms. The real system carries a larger symmetry: its unknowns may be recombined by any pointwise invertible real-linear substitution w=φv'+ψ v', the complex gauges being the case ψ0. We prove the absorption theorem: re-normalizing through the pipeline after any such substitution returns to the gauge orbit of the original equation, with a universal explicit gauge φ=-iλ/(φ-ψ), where λ is the spectral root of the structure polynomial.